\documentclass[12pt]{article}
\usepackage{xeCJK} %调用 xeCJK 宏包
\title{随机三阶行列式计算}  %文章标题
\author{豆芽菜}   %作者的名称
\date{\today}       %日期
\usepackage{amsmath}
\usepackage{amssymb}
\begin{document}
	\maketitle
	\begin{large}
		$\\001. \begin{vmatrix} 3&0&8\\2&8&6\\4&1&1 \end{vmatrix} =    \qquad  $
		$002. \begin{vmatrix} 5&0&6\\0&0&3\\0&0&0 \end{vmatrix} =    \qquad  $
		$003. \begin{vmatrix} 3&2&8\\3&2&6\\2&3&3 \end{vmatrix} =    \qquad \\ $
		$004. \begin{vmatrix} 5&4&5\\8&1&5\\5&4&7 \end{vmatrix} =    \qquad  $
		$005. \begin{vmatrix} 6&2&1\\5&0&0\\5&1&1 \end{vmatrix} =    \qquad  $
		$006. \begin{vmatrix} 7&1&2\\7&4&1\\7&4&4 \end{vmatrix} =    \qquad \\ $
		$007. \begin{vmatrix} 7&3&8\\7&6&5\\0&4&1 \end{vmatrix} =    \qquad  $
		$008. \begin{vmatrix} 2&5&5\\5&5&3\\8&3&8 \end{vmatrix} =    \qquad  $
		$009. \begin{vmatrix} 3&4&8\\6&2&0\\2&8&3 \end{vmatrix} =    \qquad \\ $
		$010. \begin{vmatrix} 2&4&6\\2&7&0\\3&0&8 \end{vmatrix} =    \qquad  $
		$011. \begin{vmatrix} 8&5&7\\6&4&4\\0&2&2 \end{vmatrix} =    \qquad  $
		$012. \begin{vmatrix} 2&8&7\\7&1&0\\8&3&7 \end{vmatrix} =    \qquad \\ $
		$013. \begin{vmatrix} 6&8&4\\7&2&1\\4&6&5 \end{vmatrix} =    \qquad  $
		$014. \begin{vmatrix} 7&6&0\\6&0&7\\4&7&1 \end{vmatrix} =    \qquad  $
		$015. \begin{vmatrix} 2&1&2\\1&6&2\\8&0&2 \end{vmatrix} =    \qquad \\ $
		$016. \begin{vmatrix} 1&7&5\\2&4&0\\8&3&4 \end{vmatrix} =    \qquad  $
		$017. \begin{vmatrix} 7&4&1\\7&1&1\\7&4&1 \end{vmatrix} =    \qquad  $
		$018. \begin{vmatrix} 7&3&8\\2&6&7\\0&8&4 \end{vmatrix} =    \qquad \\ $
		$019. \begin{vmatrix} 3&6&8\\7&6&0\\7&5&3 \end{vmatrix} =    \qquad  $
		$020. \begin{vmatrix} 6&7&3\\2&0&7\\4&1&6 \end{vmatrix} =    \qquad  $
		$021. \begin{vmatrix} 0&8&1\\5&3&8\\4&2&2 \end{vmatrix} =    \qquad \\ $
		$022. \begin{vmatrix} 6&8&2\\4&0&7\\8&0&4 \end{vmatrix} =    \qquad  $
		$023. \begin{vmatrix} 6&7&5\\7&4&4\\2&0&7 \end{vmatrix} =    \qquad  $
		$024. \begin{vmatrix} 7&2&1\\3&8&2\\7&7&0 \end{vmatrix} =    \qquad \\ $
		$025. \begin{vmatrix} 2&3&3\\0&2&1\\1&0&1 \end{vmatrix} =    \qquad  $
		$026. \begin{vmatrix} 8&7&0\\6&2&3\\6&7&8 \end{vmatrix} =    \qquad  $
		$027. \begin{vmatrix} 2&1&1\\5&3&2\\7&3&2 \end{vmatrix} =    \qquad \\ $
		$028. \begin{vmatrix} 7&5&3\\3&5&3\\6&5&1 \end{vmatrix} =    \qquad  $
		$029. \begin{vmatrix} 6&5&6\\3&3&5\\4&0&2 \end{vmatrix} =    \qquad  $
		$030. \begin{vmatrix} 3&0&0\\1&8&5\\2&2&2 \end{vmatrix} =    \qquad \\ $
		$031. \begin{vmatrix} 5&4&3\\3&4&0\\1&4&0 \end{vmatrix} =    \qquad  $
		$032. \begin{vmatrix} 4&7&6\\8&4&0\\3&4&7 \end{vmatrix} =    \qquad  $
		$033. \begin{vmatrix} 2&2&3\\1&7&8\\8&8&7 \end{vmatrix} =    \qquad \\ $
		$034. \begin{vmatrix} 1&2&0\\6&6&8\\1&4&8 \end{vmatrix} =    \qquad  $
		$035. \begin{vmatrix} 3&4&8\\5&2&0\\6&4&7 \end{vmatrix} =    \qquad  $
		$036. \begin{vmatrix} 6&1&2\\5&7&5\\7&7&1 \end{vmatrix} =    \qquad \\ $
		$037. \begin{vmatrix} 8&4&0\\2&3&0\\3&2&7 \end{vmatrix} =    \qquad  $
		$038. \begin{vmatrix} 6&6&1\\3&2&4\\7&4&3 \end{vmatrix} =    \qquad  $
		$039. \begin{vmatrix} 2&1&6\\3&3&7\\8&0&5 \end{vmatrix} =    \qquad \\ $
		$040. \begin{vmatrix} 2&6&6\\6&8&3\\5&1&1 \end{vmatrix} =    \qquad  $
		$041. \begin{vmatrix} 2&1&5\\4&7&5\\4&0&0 \end{vmatrix} =    \qquad  $
		$042. \begin{vmatrix} 1&2&7\\5&1&2\\6&8&7 \end{vmatrix} =    \qquad \\ $
		$043. \begin{vmatrix} 3&7&6\\2&3&7\\4&6&7 \end{vmatrix} =    \qquad  $
		$044. \begin{vmatrix} 3&1&8\\5&5&7\\6&4&3 \end{vmatrix} =    \qquad  $
		$045. \begin{vmatrix} 3&6&7\\8&7&3\\8&6&3 \end{vmatrix} =    \qquad \\ $
		$046. \begin{vmatrix} 7&3&6\\2&0&7\\4&3&1 \end{vmatrix} =    \qquad  $
		$047. \begin{vmatrix} 8&7&0\\5&2&3\\4&1&0 \end{vmatrix} =    \qquad  $
		$048. \begin{vmatrix} 6&0&6\\3&5&4\\0&2&0 \end{vmatrix} =    \qquad \\ $
		$049. \begin{vmatrix} 8&2&8\\6&4&5\\2&6&2 \end{vmatrix} =    \qquad  $
		$050. \begin{vmatrix} 6&6&4\\2&3&4\\0&4&8 \end{vmatrix} =    \qquad  $
		$051. \begin{vmatrix} 2&6&0\\6&5&7\\4&3&5 \end{vmatrix} =    \qquad \\ $
		$052. \begin{vmatrix} 5&1&6\\5&3&4\\0&1&4 \end{vmatrix} =    \qquad  $
		$053. \begin{vmatrix} 1&4&7\\6&5&0\\5&6&3 \end{vmatrix} =    \qquad  $
		$054. \begin{vmatrix} 4&5&1\\1&4&2\\1&0&1 \end{vmatrix} =    \qquad \\ $
		$055. \begin{vmatrix} 0&6&2\\0&8&1\\3&4&7 \end{vmatrix} =    \qquad  $
		$056. \begin{vmatrix} 8&1&3\\0&0&2\\3&1&3 \end{vmatrix} =    \qquad  $
		$057. \begin{vmatrix} 1&2&3\\8&7&7\\5&6&0 \end{vmatrix} =    \qquad \\ $
		$058. \begin{vmatrix} 3&6&8\\6&3&5\\0&6&3 \end{vmatrix} =    \qquad  $
		$059. \begin{vmatrix} 1&0&4\\2&4&0\\8&8&3 \end{vmatrix} =    \qquad  $
		$060. \begin{vmatrix} 4&7&4\\0&3&6\\8&7&3 \end{vmatrix} =    \qquad \\ $
		$061. \begin{vmatrix} 1&7&6\\1&8&5\\8&5&5 \end{vmatrix} =    \qquad  $
		$062. \begin{vmatrix} 4&5&1\\1&7&0\\6&4&6 \end{vmatrix} =    \qquad  $
		$063. \begin{vmatrix} 2&6&2\\5&4&5\\6&2&1 \end{vmatrix} =    \qquad \\ $
		$064. \begin{vmatrix} 1&7&2\\5&8&7\\2&4&6 \end{vmatrix} =    \qquad  $
		$065. \begin{vmatrix} 6&4&3\\6&4&8\\4&5&5 \end{vmatrix} =    \qquad  $
		$066. \begin{vmatrix} 3&6&1\\2&5&5\\7&1&0 \end{vmatrix} =    \qquad \\ $
		$067. \begin{vmatrix} 2&1&2\\7&5&6\\5&4&0 \end{vmatrix} =    \qquad  $
		$068. \begin{vmatrix} 8&1&3\\7&5&5\\1&3&7 \end{vmatrix} =    \qquad  $
		$069. \begin{vmatrix} 8&1&6\\0&1&0\\2&1&6 \end{vmatrix} =    \qquad \\ $
		$070. \begin{vmatrix} 2&4&1\\6&3&1\\8&6&1 \end{vmatrix} =    \qquad  $
		$071. \begin{vmatrix} 0&0&6\\0&3&4\\6&4&2 \end{vmatrix} =    \qquad  $
		$072. \begin{vmatrix} 3&8&6\\4&3&2\\7&8&5 \end{vmatrix} =    \qquad \\ $
		$073. \begin{vmatrix} 0&5&3\\4&5&1\\3&5&8 \end{vmatrix} =    \qquad  $
		$074. \begin{vmatrix} 7&8&6\\4&0&8\\3&3&7 \end{vmatrix} =    \qquad  $
		$075. \begin{vmatrix} 5&0&7\\8&3&6\\7&0&4 \end{vmatrix} =    \qquad \\ $
		$076. \begin{vmatrix} 8&7&5\\4&8&3\\4&5&5 \end{vmatrix} =    \qquad  $
		$077. \begin{vmatrix} 6&6&8\\2&2&1\\7&0&1 \end{vmatrix} =    \qquad  $
		$078. \begin{vmatrix} 3&1&3\\0&4&6\\7&7&4 \end{vmatrix} =    \qquad \\ $
		$079. \begin{vmatrix} 4&3&1\\2&6&8\\4&6&5 \end{vmatrix} =    \qquad  $
		$080. \begin{vmatrix} 8&7&5\\2&8&8\\3&7&8 \end{vmatrix} =    \qquad  $
		$081. \begin{vmatrix} 0&8&5\\2&7&8\\5&4&2 \end{vmatrix} =    \qquad \\ $
		$082. \begin{vmatrix} 8&8&3\\1&6&0\\1&8&3 \end{vmatrix} =    \qquad  $
		$083. \begin{vmatrix} 8&2&1\\3&7&2\\4&5&5 \end{vmatrix} =    \qquad  $
		$084. \begin{vmatrix} 8&1&0\\5&7&1\\7&7&7 \end{vmatrix} =    \qquad \\ $
		$085. \begin{vmatrix} 2&2&8\\4&0&2\\7&1&5 \end{vmatrix} =    \qquad  $
		$086. \begin{vmatrix} 1&8&4\\7&4&1\\0&1&7 \end{vmatrix} =    \qquad  $
		$087. \begin{vmatrix} 0&5&4\\4&5&2\\4&2&5 \end{vmatrix} =    \qquad \\ $
		$088. \begin{vmatrix} 8&8&5\\4&8&0\\2&3&5 \end{vmatrix} =    \qquad  $
		$089. \begin{vmatrix} 0&3&5\\0&3&7\\2&6&7 \end{vmatrix} =    \qquad  $
		$090. \begin{vmatrix} 4&6&2\\0&6&5\\2&7&8 \end{vmatrix} =    \qquad \\ $
		$091. \begin{vmatrix} 4&1&2\\7&4&5\\2&6&2 \end{vmatrix} =    \qquad  $
		$092. \begin{vmatrix} 4&5&5\\2&5&5\\2&4&7 \end{vmatrix} =    \qquad  $
		$093. \begin{vmatrix} 4&0&4\\5&5&2\\1&5&5 \end{vmatrix} =    \qquad \\ $
		$094. \begin{vmatrix} 3&8&2\\3&3&3\\8&3&6 \end{vmatrix} =    \qquad  $
		$095. \begin{vmatrix} 1&8&6\\5&4&1\\3&7&8 \end{vmatrix} =    \qquad  $
		$096. \begin{vmatrix} 1&3&0\\7&2&0\\2&3&3 \end{vmatrix} =    \qquad \\ $
		$097. \begin{vmatrix} 0&3&2\\4&1&8\\4&7&5 \end{vmatrix} =    \qquad  $
		$098. \begin{vmatrix} 5&2&8\\1&8&5\\7&7&1 \end{vmatrix} =    \qquad  $
		$099. \begin{vmatrix} 8&8&8\\3&1&0\\6&3&5 \end{vmatrix} =    \qquad \\ $
		$100. \begin{vmatrix} 4&4&5\\8&2&8\\5&0&2 \end{vmatrix} =    \qquad  $
		$101. \begin{vmatrix} 1&7&3\\0&8&3\\0&2&7 \end{vmatrix} =    \qquad  $
		$102. \begin{vmatrix} 5&6&1\\8&5&5\\2&7&1 \end{vmatrix} =    \qquad \\ $
		$103. \begin{vmatrix} 0&7&8\\7&4&0\\1&6&0 \end{vmatrix} =    \qquad  $
		$104. \begin{vmatrix} 8&0&6\\2&8&8\\8&0&8 \end{vmatrix} =    \qquad  $
		$105. \begin{vmatrix} 2&6&3\\4&7&5\\4&0&4 \end{vmatrix} =    \qquad \\ $
		$106. \begin{vmatrix} 5&0&1\\5&5&7\\1&3&4 \end{vmatrix} =    \qquad  $
		$107. \begin{vmatrix} 0&3&6\\8&8&2\\3&4&8 \end{vmatrix} =    \qquad  $
		$108. \begin{vmatrix} 4&7&1\\8&5&2\\1&0&7 \end{vmatrix} =    \qquad \\ $
		$109. \begin{vmatrix} 2&2&3\\7&2&2\\0&4&8 \end{vmatrix} =    \qquad  $
		$110. \begin{vmatrix} 7&4&1\\8&4&5\\3&0&4 \end{vmatrix} =    \qquad  $
		$111. \begin{vmatrix} 2&0&1\\6&2&1\\4&0&3 \end{vmatrix} =    \qquad \\ $
		$112. \begin{vmatrix} 8&4&6\\0&0&6\\1&3&8 \end{vmatrix} =    \qquad  $
		$113. \begin{vmatrix} 8&2&0\\6&8&8\\7&8&6 \end{vmatrix} =    \qquad  $
		$114. \begin{vmatrix} 3&2&6\\5&8&6\\2&1&3 \end{vmatrix} =    \qquad \\ $
		$115. \begin{vmatrix} 4&1&7\\4&5&0\\8&4&4 \end{vmatrix} =    \qquad  $
		$116. \begin{vmatrix} 3&2&7\\6&4&5\\7&1&7 \end{vmatrix} =    \qquad  $
		$117. \begin{vmatrix} 2&0&4\\6&3&1\\2&8&3 \end{vmatrix} =    \qquad \\ $
		$118. \begin{vmatrix} 1&7&8\\3&0&0\\6&3&1 \end{vmatrix} =    \qquad  $
		$119. \begin{vmatrix} 5&5&6\\8&2&8\\2&6&5 \end{vmatrix} =    \qquad  $
		$120. \begin{vmatrix} 4&5&0\\4&7&4\\6&7&0 \end{vmatrix} =    \qquad \\ $
		$121. \begin{vmatrix} 8&7&3\\0&1&4\\3&0&8 \end{vmatrix} =    \qquad  $
		$122. \begin{vmatrix} 7&6&1\\3&1&3\\4&6&8 \end{vmatrix} =    \qquad  $
		$123. \begin{vmatrix} 6&2&6\\3&3&1\\5&4&3 \end{vmatrix} =    \qquad \\ $
		$124. \begin{vmatrix} 8&1&7\\5&4&5\\4&8&7 \end{vmatrix} =    \qquad  $
		$125. \begin{vmatrix} 8&3&0\\0&8&1\\7&5&7 \end{vmatrix} =    \qquad  $
		$126. \begin{vmatrix} 2&1&6\\8&6&5\\0&7&3 \end{vmatrix} =    \qquad \\ $
		$127. \begin{vmatrix} 6&1&8\\3&6&1\\4&0&6 \end{vmatrix} =    \qquad  $
		$128. \begin{vmatrix} 5&8&5\\2&4&0\\3&5&2 \end{vmatrix} =    \qquad  $
		$129. \begin{vmatrix} 7&8&3\\7&6&4\\4&4&5 \end{vmatrix} =    \qquad \\ $
		$130. \begin{vmatrix} 4&2&6\\8&0&0\\1&8&3 \end{vmatrix} =    \qquad  $
		$131. \begin{vmatrix} 5&6&4\\3&1&3\\3&0&4 \end{vmatrix} =    \qquad  $
		$132. \begin{vmatrix} 5&0&2\\7&0&1\\4&3&5 \end{vmatrix} =    \qquad \\ $
		$133. \begin{vmatrix} 3&4&3\\0&7&5\\1&8&4 \end{vmatrix} =    \qquad  $
		$134. \begin{vmatrix} 1&8&2\\5&7&6\\8&3&2 \end{vmatrix} =    \qquad  $
		$135. \begin{vmatrix} 1&6&7\\8&2&3\\0&2&8 \end{vmatrix} =    \qquad \\ $
		$136. \begin{vmatrix} 3&1&5\\3&3&6\\7&3&0 \end{vmatrix} =    \qquad  $
		$137. \begin{vmatrix} 1&2&7\\1&1&5\\3&8&4 \end{vmatrix} =    \qquad  $
		$138. \begin{vmatrix} 8&5&0\\0&4&1\\4&6&5 \end{vmatrix} =    \qquad \\ $
		$139. \begin{vmatrix} 2&0&5\\7&2&7\\0&7&1 \end{vmatrix} =    \qquad  $
		$140. \begin{vmatrix} 3&5&1\\5&3&0\\3&6&1 \end{vmatrix} =    \qquad  $
		$141. \begin{vmatrix} 7&3&3\\4&6&2\\6&8&3 \end{vmatrix} =    \qquad \\ $
		$142. \begin{vmatrix} 7&6&3\\4&5&1\\2&5&8 \end{vmatrix} =    \qquad  $
		$143. \begin{vmatrix} 0&2&3\\8&0&7\\5&6&6 \end{vmatrix} =    \qquad  $
		$144. \begin{vmatrix} 5&1&5\\1&6&0\\6&5&3 \end{vmatrix} =    \qquad \\ $
		$145. \begin{vmatrix} 2&7&8\\5&7&0\\7&8&7 \end{vmatrix} =    \qquad  $
		$146. \begin{vmatrix} 1&5&0\\4&8&3\\7&3&1 \end{vmatrix} =    \qquad  $
		$147. \begin{vmatrix} 5&3&3\\7&4&3\\1&4&6 \end{vmatrix} =    \qquad \\ $
		$148. \begin{vmatrix} 8&7&8\\2&6&5\\6&3&8 \end{vmatrix} =    \qquad  $
		$149. \begin{vmatrix} 0&7&2\\7&2&5\\4&2&7 \end{vmatrix} =    \qquad  $
		$150. \begin{vmatrix} 8&1&8\\3&1&4\\7&3&1 \end{vmatrix} =    \qquad \\ $
		$151. \begin{vmatrix} 7&5&4\\8&7&4\\7&4&4 \end{vmatrix} =    \qquad  $
		$152. \begin{vmatrix} 5&2&7\\4&0&4\\8&3&2 \end{vmatrix} =    \qquad  $
		$153. \begin{vmatrix} 0&0&6\\5&0&1\\5&5&8 \end{vmatrix} =    \qquad \\ $
		$154. \begin{vmatrix} 5&6&0\\6&1&1\\8&6&0 \end{vmatrix} =    \qquad  $
		$155. \begin{vmatrix} 1&8&7\\4&6&7\\5&5&6 \end{vmatrix} =    \qquad  $
		$156. \begin{vmatrix} 2&3&8\\7&0&7\\3&7&1 \end{vmatrix} =    \qquad \\ $
		$157. \begin{vmatrix} 2&4&1\\3&7&7\\4&8&5 \end{vmatrix} =    \qquad  $
		$158. \begin{vmatrix} 5&3&2\\6&8&1\\4&2&5 \end{vmatrix} =    \qquad  $
		$159. \begin{vmatrix} 2&0&4\\4&4&2\\6&6&1 \end{vmatrix} =    \qquad \\ $
		$160. \begin{vmatrix} 6&2&5\\3&2&8\\1&8&3 \end{vmatrix} =    \qquad  $
		$161. \begin{vmatrix} 6&4&0\\2&0&2\\3&2&6 \end{vmatrix} =    \qquad  $
		$162. \begin{vmatrix} 7&7&2\\6&1&0\\0&7&6 \end{vmatrix} =    \qquad \\ $
		$163. \begin{vmatrix} 1&1&3\\3&7&0\\6&3&2 \end{vmatrix} =    \qquad  $
		$164. \begin{vmatrix} 8&5&8\\8&0&8\\0&8&1 \end{vmatrix} =    \qquad  $
		$165. \begin{vmatrix} 4&5&4\\5&8&6\\4&7&1 \end{vmatrix} =    \qquad \\ $
		$166. \begin{vmatrix} 7&4&6\\3&6&6\\1&0&8 \end{vmatrix} =    \qquad  $
		$167. \begin{vmatrix} 7&8&8\\8&2&8\\5&0&8 \end{vmatrix} =    \qquad  $
		$168. \begin{vmatrix} 0&6&6\\6&0&5\\2&2&7 \end{vmatrix} =    \qquad \\ $
		$169. \begin{vmatrix} 5&3&0\\5&2&2\\0&5&7 \end{vmatrix} =    \qquad  $
		$170. \begin{vmatrix} 5&6&0\\0&6&2\\3&3&1 \end{vmatrix} =    \qquad  $
		$171. \begin{vmatrix} 1&6&0\\5&7&4\\6&1&6 \end{vmatrix} =    \qquad \\ $
		$172. \begin{vmatrix} 7&1&6\\3&3&0\\8&1&8 \end{vmatrix} =    \qquad  $
		$173. \begin{vmatrix} 0&5&1\\5&0&2\\3&1&8 \end{vmatrix} =    \qquad  $
		$174. \begin{vmatrix} 8&1&3\\5&0&5\\5&0&1 \end{vmatrix} =    \qquad \\ $
		$175. \begin{vmatrix} 4&4&3\\6&6&0\\2&8&8 \end{vmatrix} =    \qquad  $
		$176. \begin{vmatrix} 5&8&7\\8&7&4\\4&3&1 \end{vmatrix} =    \qquad  $
		$177. \begin{vmatrix} 5&6&0\\4&2&5\\5&7&3 \end{vmatrix} =    \qquad \\ $
		$178. \begin{vmatrix} 1&6&5\\5&5&5\\3&3&4 \end{vmatrix} =    \qquad  $
		$179. \begin{vmatrix} 6&8&8\\6&7&8\\7&4&0 \end{vmatrix} =    \qquad  $
		$180. \begin{vmatrix} 3&4&6\\8&8&0\\6&8&6 \end{vmatrix} =    \qquad \\ $
		$181. \begin{vmatrix} 2&7&2\\3&1&1\\2&6&6 \end{vmatrix} =    \qquad  $
		$182. \begin{vmatrix} 0&8&8\\7&2&7\\6&2&2 \end{vmatrix} =    \qquad  $
		$183. \begin{vmatrix} 3&6&8\\8&7&1\\1&8&1 \end{vmatrix} =    \qquad \\ $
		$184. \begin{vmatrix} 5&5&7\\7&8&8\\5&0&8 \end{vmatrix} =    \qquad  $
		$185. \begin{vmatrix} 7&4&4\\7&8&0\\6&8&5 \end{vmatrix} =    \qquad  $
		$186. \begin{vmatrix} 1&1&1\\8&0&6\\8&3&3 \end{vmatrix} =    \qquad \\ $
		$187. \begin{vmatrix} 7&0&2\\0&1&7\\7&3&8 \end{vmatrix} =    \qquad  $
		$188. \begin{vmatrix} 3&3&3\\0&7&2\\4&5&8 \end{vmatrix} =    \qquad  $
		$189. \begin{vmatrix} 1&6&4\\6&4&1\\8&4&1 \end{vmatrix} =    \qquad \\ $
		$190. \begin{vmatrix} 4&0&7\\4&0&2\\8&0&7 \end{vmatrix} =    \qquad  $
		$191. \begin{vmatrix} 0&6&4\\2&6&2\\0&1&1 \end{vmatrix} =    \qquad  $
		$192. \begin{vmatrix} 0&6&8\\6&0&2\\3&4&0 \end{vmatrix} =    \qquad \\ $
		$193. \begin{vmatrix} 1&2&0\\0&0&5\\1&8&1 \end{vmatrix} =    \qquad  $
		$194. \begin{vmatrix} 2&2&4\\0&4&5\\6&5&8 \end{vmatrix} =    \qquad  $
		$195. \begin{vmatrix} 3&3&7\\1&2&5\\6&3&4 \end{vmatrix} =    \qquad \\ $
		$196. \begin{vmatrix} 5&4&4\\0&4&1\\0&7&7 \end{vmatrix} =    \qquad  $
		$197. \begin{vmatrix} 1&6&6\\7&3&7\\7&6&1 \end{vmatrix} =    \qquad  $
		$198. \begin{vmatrix} 4&0&8\\1&5&3\\2&5&6 \end{vmatrix} =    \qquad \\ $
		$199. \begin{vmatrix} 7&7&4\\5&1&0\\5&8&7 \end{vmatrix} =    \qquad  $
		$200. \begin{vmatrix} 0&8&8\\2&8&8\\5&0&7 \end{vmatrix} =    \qquad  $
		$201. \begin{vmatrix} 1&8&1\\6&8&6\\3&5&0 \end{vmatrix} =    \qquad \\ $
	\end{large}
	\\ The answer is at list
	\\ '001.det=-234', '002.det=0', '003.det=10', '004.det=-54', '005.det=-5\\\\', '006.det=63', '007.det=105', '008.det=-143', '009.det=298', '010.det=-78\\\\', '011.det=24', '012.det=-287', '013.det=-88', '014.det=-211', '015.det=-58\\\\', '016.det=-170', '017.det=0', '018.det=-120', '019.det=-128', '020.det=76\\\\', '021.det=174', '022.det=320', '023.det=-159', '024.det=-105', '025.det=1\\\\', '026.det=-250', '027.det=-2', '028.det=-40', '029.det=34', '030.det=18\\\\', '031.det=24', '032.det=-160', '033.det=-60', '034.det=-64', '035.det=-34\\\\', '036.det=-166', '037.det=112', '038.det=52', '039.det=-73', '040.det=-140\\\\', '041.det=-120', '042.det=183', '043.det=35', '044.det=-92', '045.det=-47\\\\', '046.det=-33', '047.det=60', '048.det=-12', '049.det=44', '050.det=-16\\\\', '051.det=-4', '052.det=50', '053.det=20', '054.det=17', '055.det=-30\\\\', '056.det=-10', '057.det=67', '058.det=117', '059.det=-52', '060.det=108\\\\', '061.det=-94', '062.det=100', '063.det=110', '064.det=-84', '065.det=-70\\\\', '066.det=162', '067.det=-12', '068.det=164', '069.det=36', '070.det=14\\\\', '071.det=-108', '072.det=15', '073.det=-130', '074.det=-128', '075.det=-87\\\\', '076.det=84', '077.det=-70', '078.det=-120', '079.det=-18', '080.det=70\\\\', '081.det=153', '082.det=126', '083.det=173', '084.det=308', '085.det=16\\\\', '086.det=-337', '087.det=-108', '088.det=140', '089.det=12', '090.det=88\\\\', '091.det=-24', '092.det=30', '093.det=140', '094.det=45', '095.det=-133\\\\', '096.det=-57', '097.det=84', '098.det=-459', '099.det=-56', '100.det=62\\\\', '101.det=50', '102.det=-92', '103.det=304', '104.det=128', '105.det=-4\\\\', '106.det=5', '107.det=-126', '108.det=-243', '109.det=-12', '110.det=32\\\\', '111.det=4', '112.det=-120', '113.det=-88', '114.det=-18', '115.det=-104\\\\', '116.det=-99', '117.det=170', '118.det=51', '119.det=-46', '120.det=8\\\\', '121.det=139', '122.det=-128', '123.det=4', '124.det=57', '125.det=429\\\\', '126.det=278', '127.det=10', '128.det=-2', '129.det=-42', '130.det=336\\\\', '131.det=-10', '132.det=27', '133.det=-37', '134.det=218', '135.det=-262\\\\', '136.det=-72', '137.det=21', '138.det=132', '139.det=151', '140.det=5\\\\', '141.det=2', '142.det=95', '143.det=118', '144.det=-68', '145.det=-219\\\\', '146.det=84', '147.det=15', '148.det=122', '149.det=-191', '150.det=-47\\\\', '151.det=-4', '152.det=72', '153.det=150', '154.det=18', '155.det=19\\\\', '156.det=336', '157.det=6', '158.det=72', '159.det=-16', '160.det=-240\\\\', '161.det=-48', '162.det=-126', '163.det=-91', '164.det=-40', '165.det=-29\\\\', '166.det=228', '167.det=-160', '168.det=-120', '169.det=-85', '170.det=36\\\\', '171.det=2', '172.det=18', '173.det=-165', '174.det=20', '175.det=108\\\\', '176.det=11', '177.det=-67', '178.det=-25', '179.det=56', '180.det=48\\\\', '181.det=-80', '182.det=240', '183.det=411', '184.det=-40', '185.det=172\\\\', '186.det=30', '187.det=-105', '188.det=78', '189.det=-20', '190.det=0\\\\', '191.det=-4', '192.det=228', '193.det=-30', '194.det=-22', '195.det=-6\\\\', '196.det=105', '197.det=339', '198.det=20', '199.det=-56', '200.det=-112\\\\', '201.det=120', 
\end{document}

